If P is a proper subset of Q, then `P nn Q =`

If mu is the universal set and P is a subset of mu then what is P nn(P-mu)uu(mu-P) equal to

If P, Q and R are the subsets of a set A, then prove that Rxx(P^(c )uuQ^(c ))^(c )=(RxxP)nn(RxxQ) .

If xi is the universal set and P is a subset of xi , then what is P nn { ( P - xi) uu (xi - P) } equal to

If P and Q are subsets of mu , then P-Q= _____________.

If P, Q and Rare subsets of a set A, then Rxx(P^(c)cupQ^(c))^(c)=

A is a set containing n elements. A subset P of A is chosen. The set A is reconstructed by replacing the elements of P. A subset Q of A is again chosen, the number of ways of choosing so that (P cup Q) is a proper subset of A, is

Suppose A is a set containing n elements. Two subsets P and Q of A are chosen at random. If the probability that P is a subset of Q is 243/1024, then n is equal to